Important Formule
Work from Days:
If A can do a piece of work in n days, then A's 1 day's work = 1 . n Days from Work:
If A's 1 day's work = 1 , then A can finish the work in n days. n Ratio:
If A is thrice as good a workman as B, then:
Ratio of work done by A and B = 3 : 1.
Ratio of times taken by A and B to finish a work = 1 : 3.
Work Done by A and B
A and B can do a piece of work in ‘a’ days and ‘b’ days respectively.
When working together they will take days to finish the work
In one day, they will finish part of work.
Efficiency is inversely proportional to the
Time taken when the amount of work done is constant.
Efficiency is inversely proportional to the
Time taken when the amount of work done is constant.
Efficiency α =
1. Question: A alone can do a piece of work in 6 days and B alone in 8 days. A and B undertook to do it for Rs.3200. With the help of C, they completed the work in 3 days. How much is to be paid to C?
Solution:
Let the total amount of work to be done be W units.
Productivity of A, Pa = W/6 units per day.
Productivity of B, Pb = W/8 units per day.
3 days x [Pa + Pb + Pc] = W => Pc = W/24 units per day
Ratio of wages of A: B: C = Ratios of their productivities = (W/6): (W/8): (W/24) = 4: 3: 1.
Amount to be paid to C = Rs.3200 x (1/8) = Rs.400
2. Question: It takes 6 hours for pump A, used alone, to fill a tank of water. Pump B used alone takes 8 hours to fill the same tank. We want to use three pumps: A, B and another pump C to fill the tank in 2 hours. What should be the rate of pump C? How long would it take pump C, used alone, to fill the tank?
Solution:
Let the total capacity of the tank be C liters.
Fill rate of pump A, Fa = C/6 liters per hr
Fill rate of pump B, Fb = C/8 liters per hr
2 hrs x [Fa + Fb + Fc] = C => Fc = 5C/24 liters per hr
Let‘t’ be the time taken by only pump C to fill the tank.
‘t’ hrs x 5C/24 = C => t = 24/5 = 4.8 hrs